Write, autoreview, editor, reviewer
3,129
edits
Line 98: | Line 98: | ||
===Quantum One Way Function=== | ===Quantum One Way Function=== | ||
Based on the fundamental principles of quantum mechanics, QOWF was proposed by Gottesman and Chuang [https://arxiv.org/abs/quant-ph/0105032] and its definition is presented as follows.</br> | Based on the fundamental principles of quantum mechanics, QOWF was proposed by Gottesman and Chuang [https://arxiv.org/abs/quant-ph/0105032] and its definition is presented as follows.</br> | ||
'''Definition 1''' Let k, <math>|f_k\rangle</math> be classical bits string of length <math>L_1</math>, quantum state of <math>L_2</math> qubits, respectively. A function <math>f : k\rightarrow |f_k\rangle</math>, where <math>|f_k\rangle</math> satisfies <math>\langle f_k|f_{k'}\rangle\le\delta < 1</math> for k\ne k', is called a QOWF under physical mechanics if | '''Definition 1''' Let k, <math>|f_k\rangle</math> be classical bits string of length <math>L_1</math>, quantum state of <math>L_2</math> qubits, respectively. A function <math>f : k\rightarrow |f_k\rangle</math>, where <math>|f_k\rangle</math> satisfies <math>\langle f_k|f_{k'}\rangle\le\delta < 1</math> for <math>k\ne k'</math>, is called a QOWF under physical mechanics if | ||
#Easy to compute: The mapping <math>f : k\rightarrow |f_k\rangle</math> is easy to compute by a quantum polynomial-time algorithm. | |||
#Hard to invert: Given <math>|f_k\rangle</math>, it is impossible to invert k by virtue of fundamental quantum information theory. | |||
===Gate Teleportation=== | ===Gate Teleportation=== |